Download presentation
Presentation is loading. Please wait.
Published byMelissa Cobb Modified over 9 years ago
1
1 © 2009 Brooks/Cole - Cengage Solutions Chapter 14 Why does a raw egg swell or shrink when placed in different solutions? PLAY MOVIE
2
2 © 2009 Brooks/Cole - Cengage Some Definitions A solution is a HOMOGENEOUS mixture of 2 or more substances in a single phase. One constituent is usually regarded as the SOLVENT and the others as SOLUTES.
3
3 © 2009 Brooks/Cole - Cengage Solutions can be classified as saturated or unsaturated. A saturated solution contains the maximum quantity of solute that dissolves at that temperature. Definitions PLAY MOVIE
4
4 © 2009 Brooks/Cole - Cengage Solutions can be classified as unsaturated or saturated. A saturated solution contains the maximum quantity of solute that dissolves at that temperature. SUPERSATURATED SOLUTIONS contain more than is possible and are unstable. Definitions PLAY MOVIE
5
5 © 2009 Brooks/Cole - Cengage Dissolving An Ionic Solid See Active Figure 14.9
6
6 © 2009 Brooks/Cole - Cengage An IDEAL SOLUTION is one where the properties depend only on the concentration of solute. Need concentration units to tell us the number of solute particles per solvent particle. The unit molarity (review) does not do this! Concentration Units
7
7 © 2009 Brooks/Cole - Cengage Concentration Units MOLE FRACTION, X For a mixture of A, B, and C MOLE FRACTION, X For a mixture of A, B, and C WEIGHT % = grams solute per 100 g solution MOLALITY, m
8
8 © 2009 Brooks/Cole - Cengage Calculating Concentrations Dissolve 62.1 g (1.00 mol) of ethylene glycol in 250. g of H 2 O. Calculate mol fraction, molality, and weight % of glycol.
9
9 © 2009 Brooks/Cole - Cengage Calculating Concentrations 250. g H 2 O = 13.9 mol Dissolve 62.1 g (1.00 mol) of ethylene glycol in 250. g of H 2 O. Calculate X, m, and % of glycol. X glycol = 0.0672
10
10 © 2009 Brooks/Cole - Cengage Calculating Concentrations Calculate molality Dissolve 62.1 g (1.00 mol) of ethylene glycol in 250. g of H 2 O. Calculate X, m, and % of glycol. Calculate weight %
11
11 © 2009 Brooks/Cole - Cengage Energetics of the Solution Process See Energetics of Dissolution of KF simulation
12
12 © 2009 Brooks/Cole - Cengage Energetics of the Solution Process If the enthalpy of formation of the solution is more negative than that of the solvent and solute, the enthalpy of solution is negative. The solution process is exothermic ! PLAY MOVIE
13
13 © 2009 Brooks/Cole - Cengage Supersaturated Sodium Acetate One application of a supersaturated solution is the sodium acetate “heat pack.”One application of a supersaturated solution is the sodium acetate “heat pack.” Sodium acetate has an ENDOthermic heat of solution.Sodium acetate has an ENDOthermic heat of solution. PLAY MOVIE
14
14 © 2009 Brooks/Cole - Cengage Supersaturated Sodium Acetate Sodium acetate has an ENDOthermic heat of solution. NaCH 3 CO 2 (s) + heat Na + (aq) + CH 3 CO 2 - (aq) Therefore, formation of solid sodium acetate from its ions is EXOTHERMIC. Na + (aq) + CH 3 CO 2 - (aq) NaCH 3 CO 2 (s) + heat
15
15 © 2009 Brooks/Cole - Cengage Dissolving Gases & Henry’s Law Gas solubility (mol/L) = k H · P gas k H for O 2 = 1.66 x 10 -6 M/mmHg (1.3 x 10 -3 mol/kg * bar) When P gas drops, solubility drops. PLAY MOVIE
16
16 © 2009 Brooks/Cole - Cengage P solvent = X solvent · P o solvent Raoult’s Law An ideal solution obeys this law. Because solvent vapor pressure & the relative # of solvent molecules are proportional: Because mole fraction of solvent, X A, is always less than 1, then P A is always less than P o A. The vapor pressure of solvent over a solution is always LOWERED !
17
17 © 2009 Brooks/Cole - Cengage Raoult’s Law Assume the solution containing 62.1 g of glycol in 250. g of water is ideal. What is the vapor pressure of water over the solution at 30 o C? (The VP of pure H 2 O is 31.8 mm Hg; see App. E.) Solution X glycol = 0.0672and so X water = ? Because X glycol + X water = 1 X water = 1.000 - 0.0672 = 0.9328 P water = X water · P o water = (0.9328)(31.8 mm Hg) P water = 29.7 mm Hg
18
18 © 2009 Brooks/Cole - Cengage Colligative Properties On adding a solute to a solvent, the properties of the solvent are modified. Vapor pressure decreasesVapor pressure decreases Melting point decreasesMelting point decreases Boiling point increasesBoiling point increases Osmosis is possible (osmotic pressure)Osmosis is possible (osmotic pressure) These changes are called COLLIGATIVE PROPERTIES. They depend only on the NUMBER of solute particles relative to solvent particles, not on the KIND of solute particles.
19
19 © 2009 Brooks/Cole - Cengage Understanding Colligative Properties To understand colligative properties, study the LIQUID-VAPOR EQUILIBRIUM for a solution.
20
20 © 2009 Brooks/Cole - Cengage Understanding Colligative Properties To understand colligative properties, study the LIQUID-VAPOR EQUILIBRIUM for a solution. PLAY MOVIE
21
21 © 2009 Brooks/Cole - Cengage P solvent = X solvent · P o solvent Understanding Colligative Properties VP of H 2 O over a solution depends on the number of H 2 O molecules per solute molecule. P solvent proportional to X solvent P solvent proportional to X solvent VP of solvent over solution = (Mol frac solvent)(VP pure solvent) RAOULT’S LAW RAOULT’S LAW
22
22 © 2009 Brooks/Cole - Cengage Changes in Freezing and Boiling Points of Solvent See Figure 14.13
23
23 © 2009 Brooks/Cole - Cengage Vapor Pressure Lowering See Figure 14.13
24
24 © 2009 Brooks/Cole - Cengage The boiling point of a solution is higher than that of the pure solvent. PLAY MOVIE
25
25 © 2009 Brooks/Cole - Cengage Elevation of Boiling Point Elevation in BP = ∆T BP = K BP ·m (where K BP is characteristic of solvent from table 14.3 p.633)
26
26 © 2009 Brooks/Cole - Cengage Change in Boiling Point Dissolve 62.1 g of glycol (1.00 mol) in 250. g of water. What is the BP of the solution? K BP = +0.512 o C/molal for water (see Table 14.3). Solution 1.Calculate solution molality = 4.00 m 2.∆T BP = K BP · m ∆T BP = +0.512 o C/molal (4.00 molal) ∆T BP = +0.512 o C/molal (4.00 molal) ∆T BP = +2.05 o C BP = 102.05 o C
27
27 © 2009 Brooks/Cole - Cengage Change in Freezing Point The freezing point of a solution is LOWER than that of the pure solvent. FP depression = ∆T FP = K FP ·m Pure water Ethylene glycol/water solution PLAY MOVIE
28
28 © 2009 Brooks/Cole - Cengage Lowering the Freezing Point Water with and without antifreezeWhen a solution freezes, the solid phase is pure water. The solution becomes more concentrated.
29
29 © 2009 Brooks/Cole - Cengage Calculate the FP of a 4.00 molal glycol/water solution. K FP = -1.86 o C/molal (Table 14.3) Solution ∆T FP = K FP · m = (-1.86 o C/molal)(4.00 m) = (-1.86 o C/molal)(4.00 m) ∆T FP = -7.44 o C Recall that ∆T BP = +2.05 ˚C for this solution. Freezing Point Depression
30
30 © 2009 Brooks/Cole - Cengage How much NaCl must be dissolved in 4.00 kg of water to lower FP to -10.00 o C? Solution Calc. required molality ∆T FP = K FP · m -10.00 o C = (-1.86 o C/molal)(Conc) -10.00 o C = (-1.86 o C/molal)(Conc) Conc = 5.38 molal Conc = 5.38 molal Freezing Point Depression
31
31 © 2009 Brooks/Cole - Cengage How much NaCl must be dissolved in 4.00 kg of water to lower FP to -10.00 o C?. Solution Conc req’d = 5.38 molal This means we need 5.38 mol of dissolved particles per kg of solvent. Recognize that m represents the total concentration of all dissolved particles. Recall that 1 mol NaCl(aq) 1 mol Na + (aq) + 1 mol Cl - (aq) Freezing Point Depression
32
32 © 2009 Brooks/Cole - Cengage How much NaCl must be dissolved in 4.00 kg of water to lower FP to -10.00 o C?. Solution Conc req’d = 5.38 molal We need 5.38 mol of dissolved particles per kg of solvent. NaCl(aq) Na + (aq) + Cl - (aq) NaCl(aq) Na + (aq) + Cl - (aq) To get 5.38 mol/kg of particles we need 5.38 mol / 2 = 2.69 mol NaCl / kg 5.38 mol / 2 = 2.69 mol NaCl / kg 2.69 mol NaCl / kg 157 g NaCl / kg (157 g NaCl / kg)(4.00 kg) = 629 g NaCl Freezing Point Depression
33
33 © 2009 Brooks/Cole - Cengage Boiling Point Elevation and Freezing Point Depression ∆T = K·m·i ∆T = K·m·i A generally useful equation i = van’t Hoff factor = number of particles produced per formula unit. CompoundTheoretical Value of i glycol1 NaCl2 CaCl 2 3
34
34 © 2009 Brooks/Cole - Cengage Osmosis Dissolving the shell in vinegar Egg in corn syrupEgg in pure water PLAY MOVIE
35
35 © 2009 Brooks/Cole - Cengage Osmosis The semipermeable membrane allows only the movement of solvent molecules. Solvent molecules move from pure solvent to solution in an attempt to make both have the same concentration of solute. Driving force is entropy
36
36 © 2009 Brooks/Cole - Cengage Process of Osmosis
37
37 © 2009 Brooks/Cole - Cengage Osmotic Pressure, ∏ Equilibrium is reached when pressure — the OSMOTIC PRESSURE, ∏ — produced by extra solution counterbalances pressure of solvent molecules moving thru the membrane. ∏ = cRT ∏ = cRT (c is conc. in mol/L) (R = 0.082057 L*atm/K*mol) (R = 0.082057 L*atm/K*mol) Osmotic pressure
38
38 © 2009 Brooks/Cole - Cengage Osmosis PLAY MOVIE
39
39 © 2009 Brooks/Cole - Cengage Osmosis at the Particulate Level See Figure 14.17
40
40 © 2009 Brooks/Cole - Cengage Osmosis Osmosis of solvent from one solution to another can continue until the solutions are ISOTONIC — they have the same concentration.Osmosis of solvent from one solution to another can continue until the solutions are ISOTONIC — they have the same concentration.
41
41 © 2009 Brooks/Cole - Cengage Osmosis and Living Cells
42
42 © 2009 Brooks/Cole - Cengage Reverse Osmosis Water Desalination Water desalination plant in Tampa
43
43 © 2009 Brooks/Cole - Cengage Osmosis Calculating a Molar Mass Dissolve 35.0 g of hemoglobin in enough water to make 1.00 L of solution. ∏ measured to be 10.0 mm Hg at 25 ˚C. Calc. molar mass of hemoglobin. Solution (a) Calc. ∏ in atmospheres ∏ = (10.0 mmHg)(1 atm / 760 mmHg) ∏ = (10.0 mmHg)(1 atm / 760 mmHg) = 0.0132 atm (b)Calc. concentration
44
44 © 2009 Brooks/Cole - Cengage Osmosis Calculating a Molar Mass Conc = 5.39 x 10 -4 mol/L Conc = 5.39 x 10 -4 mol/L (c)Calc. molar mass Molar mass = 35.0 g / 5.39 x 10 -4 mol/L Molar mass = 35.0 g / 5.39 x 10 -4 mol/L Molar mass = 65,100 g/mol Molar mass = 65,100 g/mol Dissolve 35.0 g of hemoglobin in enough water to make 1.00 L of solution. ∏ measured to be 10.0 mm Hg at 25 ˚C. Calc. molar mass of hemoglobin. Solution (b)Calc. concentration from ∏ = cRT Conc. =0.0132 atm / (0.0821) (298 K) Conc. =0.0132 atm / (0.0821) (298 K) L*atm/K*mol L*atm/K*mol
Similar presentations
© 2024 SlidePlayer.com. Inc.
All rights reserved.